Define the binary operation $ by a$b = ab + 2a – 3b. Find x$(2$x).

A. x^2 – 9x + 12       B. x^2 + 12x + 9 

C. - x^2 + 12x – 9     D. x^2 – 12x – 9 

E. - x^2 + 9x – 12

3. The

For real numbers x and y, define the binary operation # by: x # y = (xy^2 + yx^2) / (5 + x^2 y^2)

Find 2 # (5 # 2).

A. 17/105   B. 17/61    C. 32/61    D. 2/3    E. 61/17

Let A and B be single nonzero digits, so that AA is a 2-digit number with identical digits. Which of the following is a value of A which satisfies AA + A = B * AB?

A. 1            B. 2          C. 3           D. 4           E. 5

For real numbers a and b, define an operation Δ as  aΔb = ab^2 – |a|. Find [(-2) Δ 5] Δ (-1).

A. -104     B. -96     C. -53     D. 0     E. 96

A town has 3.75 people per family and 2.5 TV’s per family. Find the number of TV’s per person. 

A. 3/5         B. 2/3          C. 3/4        D. 4/5        E. 5/6

A triangle with integer-length sides has no two sides equal. What is its least possible perimeter? 

A. 6       B. 7       C. 8        D. 9       E. 10

Points A and B lie on a circle with radius 6 units centered at C. The measure of ∠ACB is 120°. Point X is outside the circle such that segments XB and XA are both tangent to the circle. Find the area of quadrilateral XACB.

A. 18√3    B. 48    C. 36√3    D. 64    E. 48√3

An open box is made by cutting an N-inch by N-inch square from each corner of a 10-inch by 12-inch rectangular piece of material and then folding up the flaps. There are two different values of N that will result in a volume of 80 cubic inches. Find the sum of these two values of N, rounded to the nearest hundredth.

A. 2.76       B. 3.76      C. 7.24       D. 8.24       E. 10

An isosceles triangle has two sides of length 40 and a base of length 48. A circle circumscribes the triangle. What is the radius of the circle? 

A. 20√2     B. 28     C. 18√3     D. 12√5     E. 25

There are exactly 2 noncongruent rectangular boxes with integer-length edges whose space diagonals have length 17. Find the ratio of the larger to the smaller volume.

A. 2      B. 3      C. 4       D. 5      E. 6

The sum of the slopes of the perpendicular lines with equations y = mx and y = Mx equals 9/20. Find |M−m|.

A. 29/20   B. 23/20   C. 37/20   D. 41/20   E. 43/20

The two lines with equations ax + 12y = 6 and ax - 3y = 12 (a ≥ 0) are perpendicular. Find a. 

A. 2     B. 3     C. 4     D. 6     E. 8

Let p and q be two constants for which the equation 2x + p = q has the solution x = 12. Find the solution to the equation 3x + q = p.

A. -18       B. -8       C. -4       D. 8       E. 18

The line Ax + By = 1 passes through the point (-9, 10), has negative slope, and has intercepts (p, 0) and (0, q). If p + q = 14, find A + B.

A. -1/28    B. -14/45    C. 1/28    D. 5/ 17    E. 14/45

The area of the four-sided region in the first quadrant bounded by the x-axis, y-axis, and the lines 3x + 4y =12 and 2y - x = 2 is cut in half by the line y = kx. Find k.

A. 33/76     B. 2/5     C. 11/19     D. 1/2     E. 21/38